Difference between revisions of "2008 iTest Problems/Problem 93"
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Revision as of 15:50, 16 September 2008
Problem
For how many positive integers , , can the set
be divided into disjoint -element subsets such that every one of the subsets contains the element which is the arithmetic mean of all the elements in that subset?
Solution
Each element subset is of the form . The sum of the elements of this subset is , which is divisible by . If is odd however, then the sum of the elements is , but and are both odd, and so the sum is not divisible by . Hence may not be odd.
For , we note that the construction works. For even greater than , we can divide each consecutive eight element subset using the same construction, eg, for . Hence, the answer is all even , of which there are .